Thank you. I did all the ellipse problems in my book just fine but it's so nice to see someone explain the WHY of it all. You put it in as much of a narrative as one possibly can in math and that's how a lot of people's brains remember stuff. Including mine!
Since f^2=j^2-n^2 where f is the focal length( the distance between the centre and either of the two foci), j is the major radius, and n is the minor radius, f is zero when j=n; consequently; the two foci coincide at the centre of the circle.
Very powerful and clear, Doctor. Please add some exam oriented questions based on conic section so that we can try to see how to handle them.... Thank you..
Let's say that the ellipse is the stretch version of the circle with two focus points called foci and the circle has one point called the center of the circle where x and y become zero.
There is a third way ellipses can be drawn. x^2+y^2±x*y=1 This ellipse has algebraic representation. Like the circle. I suppose all ellipses can have algebraic representation, if you know what you're doing. What I mean is in the generation, a simple function is used. Eisenstien Triples reflect that. I guess they could also be polynomials. Also, they could be put in the Mandelbrot set. Here are some projects I made on Khan Academy. www.khanacademy.org/profile/TomMoose/projects There are 4 ellipse Mandelbrots and 1 mixed circle/ellipse Mandelbrot set. (z^3+c^3)^2+c is also interesting. I made some videos on it.
![Felix "Unfair" | [Stray Kids : SKZ-PLAYER]](http://i.ytimg.com/vi/Oswujxm2Ag0/mqdefault.jpg)
How i wish this Gentle man was my tutor at college. He is naturally gifted by God
Possibly gifted by science
@@phil97n Science isn't a person.
Being watching most explanations on eclipses you did it the best.
i look at your videos for help and i wish i had you as my teacher
Awww thanks! Good luck to you!
Thank you. I did all the ellipse problems in my book just fine but it's so nice to see someone explain the WHY of it all. You put it in as much of a narrative as one possibly can in math and that's how a lot of people's brains remember stuff. Including mine!
Since f^2=j^2-n^2 where f is the focal length( the distance between the centre and either of the two foci), j is the major radius, and n is the minor radius, f is zero when j=n; consequently; the two foci coincide at the centre of the circle.
Can you share the link of the rest of the lesson?
Wow I enjoyed the tutorial,
😍♥️
THIS IS SUCH A GOOD EXPLANATION THANK YOU SO MUCHHH!!!!
Thank God for you! I really mean that!!
Love from india 🇨🇮
Great work sir🫡
This lecturer tutorial is very interesting i normal understand his teachings
Awesome Explanation!
I UNDERSTAND!!!!! THANK YOU!!!!!!
SUPERB PRESENTATION SIR.
#thanks indeed !
Very powerful and clear, Doctor. Please add some exam oriented questions based on conic section so that we can try to see how to handle them.... Thank you..
Why so many videos are private in this unit,
Thank you. !! Great explanation could you please do some videos on Cartesian geometry?!
Great works! Where is part2
Most skillfully and beautifully explained. Thank you.
Nice explanation sir thank you.
But why the other parts are hidden only two parts are available ??
Nice . Thank u for teach us..👍👍
You are very welcome!
why the succeeding videos are private
this guy is goated
Is there a part 2 or what playlist is this video from?
It is easy to learn conic sections and also the different kinds of conic sections.
Pythogras makes circle i understood all thanks
Thank you sir!! Watching from Turkey
Brilliant classes, thank for such brilliant free education, regards from India
i love your teaching style.
Doctor I wish I am attends the school you teaches. Perfect explanation.
Million of thanks sir
Great lecture.. thank you so much
Thank you Jason and I like your hair and your math and science polo shirts.
Thank you greatly Gentle man may God reward you abundantly in addition to your intelligence.
Very important
Excellent explanation I really appreciate the way you explain
THANK YOU... SIR...!!!
GREAT...!!!
Most welcome!
Many thanks...
this was the best
Thank you!
Let's say that the ellipse is the stretch version of the circle with two focus points called foci and the circle has one point called the center of the circle where x and y become zero.
I love you work….I wish you great health and happiness, many children and a long life…..gods bless you
Good work
Wow excellent and clear explanation thank u
amazing way to understand an equation of the elliptical part of things like a lens system 🧐 thank you.
Thank you so much sir.
sir, It is better if you give the link description of part 2🇧🇩
Where is Part 2?
Why would we want to stretch a circle 😳😳😳😳 why don’t you leave it the way it was?
We are not streching it but that's a behaviour of a body in which it moves
Thank u sir
That was great💗
Nice sirji
Sir please high school maths compleat video send
How to prove your answer
Thanks
Welcome!
nice
Just like Mr sikayomya
Only 45 comments 😳😳😳
this is making me confdenshal
🤯
There is a third way ellipses can be drawn. x^2+y^2±x*y=1
This ellipse has algebraic representation. Like the circle. I suppose all ellipses can have algebraic representation, if you know what you're doing. What I mean is in the generation, a simple function is used. Eisenstien Triples reflect that. I guess they could also be polynomials. Also, they could be put in the Mandelbrot set.
Here are some projects I made on Khan Academy.
www.khanacademy.org/profile/TomMoose/projects
There are 4 ellipse Mandelbrots and 1 mixed circle/ellipse Mandelbrot set. (z^3+c^3)^2+c is also interesting. I made some videos on it.